English

Hierarchical formula classes with respect to semi-classical prenex normalization

Logic 2025-06-30 v1

Abstract

In [10], the authors formalized the standard transformation procedure for prenex normalization of first-order formulas and showed that the classes Ek\mathrm{E}_k and Uk\mathrm{U}_k introduced in Akama et al. [1] are exactly the classes induced by Σk\Sigma_k and Πk\Pi_k respectively via the transformation procedure. In that sense, the classes Ek\mathrm{E}_k and Uk\mathrm{U}_k correspond to Σk\Sigma_k and Πk\Pi_k based on classical logic respectively. On the other hand, some transformations of the prenex normalization are not possible in constructive theories. In this paper, we introduce new classes Ekn\mathcal{E}_k^n and Ukn\mathcal{U}_k^n of first-order formulas with two parameters kk and nn, and show that they are exactly the classes induced by Σk\Sigma_k and Πk\Pi_k respectively according to the nn-th level semi-classical prenex normalization, which is obtained by the prenex normalization in [10] with some restriction to the introduced classes of degree nn. In particular, the latter corresponds to possible transformations in intuitionistic arithmetic augmented with the law-of-excluded-middle schema restricted to formulas of Σn\Sigma_n-form. In fact, if nk n\geq k, our classes Ekn\mathcal{E}_k^n and Ukn\mathcal{U}_k^n are identical with the cumulative variants Ek+\mathrm{E}^+_k and Uk+\mathrm{U}^+_k of Ek\mathrm{E}_k and Uk\mathrm{U}_k respectively. In this sense, our classes are refinements of Ek+\mathrm{E}^+_k and Uk+\mathrm{U}^+_k with respect to the prenex normalization from the semi-classical perspective.

Cite

@article{arxiv.2506.22348,
  title  = {Hierarchical formula classes with respect to semi-classical prenex normalization},
  author = {Makoto Fujiwara and Taishi Kurahashi},
  journal= {arXiv preprint arXiv:2506.22348},
  year   = {2025}
}

Comments

29 pages

R2 v1 2026-07-01T03:36:47.128Z